Existence and the reducibility of the Hilbert scheme of linearly normal curves in Pr of relatively high degrees

Abstract

Let Hd,g,r be the Hilbert scheme parametrizing smooth irreducible and non-degenerate curves of degree d and genus g in Pr. We denote by HLd,g,r the union of those components of Hd,g,r whose general element is linearly normal. In this article we show that HLd,g,r (d g+r-3) is non-empty in a certain optimal range of triples (d,g,r) and is empty outside the range. This settles the existence (or non-emptiness if one prefers) of the Hilbert scheme HLd,g,r of linearly normal curves of degree d and genus g in Pr for g+r-3 d g+r, r 3. We also determine all the triples (d,g,r) with g+r-3 d g+r for which HLd,g,r is reducible (or irreducible).

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